Solve

Guides

You visited us 0 times! Enjoying our articles? Unlock Full Access!

Question

The dimension of $\frac{h}{m v}$ is: ( $h$ $=$ planks constant, $m$ = mass, $v$ =velocity)
$M$
$L$
$T$
none of the above

L

none of the above

M

T

Open in App

Solution

Verified by Toppr

Debroglie wavelength is given by: $λ = \frac{h}{m v}$
Wavelength has dimension of length $[L]$ .

Was this answer helpful?

Similar Questions

The dimension of

\frac{h}{m v}

is: (

h

=

planks constant,

m

= mass,

v

=velocity)

View Solution

The dimension of the quantity

\frac{1}{e_{0}} \frac{e^{2}}{h c}

is ( e= charge of electron, h= Planks constant and c= velocity of light)

View Solution

The energy (

E

), angular momentum (

L

) and universal gravitational constant (

G

) are chosen as fundamental quantities. The dimensions of universal gravitational constant in the dimensional formula of planks constant (

h

) is :

View Solution

Þ a = 1/2

Now putting a = 1/2 in equation (3)

Þ b = 3/2

On substituting value a, b and c in equation (1) T = k(d)^1/2 (r)^3/2 (s)^_1/2

Hence the correct answer is (c).

Level-3

Illustration 1. A spherical body of mass m and radius r is allowed to fall in a medium of viscosity h. The time in which the velocity of the body increases from zero to 0.63 times the terminal velocity (v) is called time constant (t). Dimensionally t can be represented by (5 min)

(a) (b)

Solution.

The dimensional formulae of mass = [M]

The dimensional formulae of radius = [L]

The dimensional formulae of viscosity = M¹L^_1T¹

So lets check the dimensions of each option

The dimension of is therefore option (a) is not correct.

The dimensions of is therefore option (b) is also not correct.

The dimension of is therefore option (c) is also not correct.

Hence the correct answer is (d).

Illustration 2. The damping force for a body moving through a fluid is proportional to velocity. What will be the dimensional formula for the constant of proportionality ? (3 min)

(a) MLT^_1 (b) ML⁰T^_1

View Solution

The total energy E possessed by a body of mass 'm', moving with a velocity 'v' at a height 'h' is given by :

E = \frac{1}{2} m v^{2} + m g h .

Find m, if

v = 3, g = 10, h = 5

and

E = 109

View Solution

The dimension of hmv is: (h= planks constant, m= mass, v=velocity)MLTnone of the above

Debroglie wavelength is given by: λ=hmvWavelength has dimension of length [L].

The dimension of $\frac{h}{m v}$ is: ( $h$ $=$ planks constant, $m$ = mass, $v$ =velocity)
$M$
$L$
$T$
none of the above

Debroglie wavelength is given by: $λ = \frac{h}{m v}$
Wavelength has dimension of length $[L]$ .